Preparing
for a flight? Completion of a weight and balance calculation is an essential
part of the process.

For
commercial flights and for other “formal” occasions, for example
your flight test or check ride, the weight and balance procedure will
be written out and detailed. For casual, recreational flights, the process
may be a bit less formal, but we are still legally responsible for ensuring
the aircraft is within its limits, both in terms of overall weight and
C of G position.

The
weight of an aircraft is important for the whole duration of a flight,
not just at take-off. Many aircraft, particularly aircraft with complex
fuel systems, are capable of both changing their weight as a result of
fuel burn and moving their C of G.

Many
aircraft are able to take off at a weight well in excess of their maximum
landing weight. The newer C-182’s, as one example, have a maximum
take-off weight of 3100 lbs. The maximum landing weight is 2950 lbs.

Leaving
the C of G problem for another day, let’s take a look at weight.
Weight is a factor in all aspects of aircraft performance. Stall speed,
maximum range airspeed, maximum endurance airspeed, maximum distance and
minimum sink glide speeds, rate of climb and manoeuvring speed are all
examples of aircraft performance tied directly to aircraft weight.

Back
in ground school we learned about the four forces involved in aircraft
flight: lift, weight, thrust and drag. Thrust opposes drag. Lift opposes
weight. We say that these forces act as couples.

If
opposing forces are equal, for example if thrust equals drag and lift
equals weight, we say the aircraft is in a state of equilibrium; aircraft
performance will remain constant. However, if lift exceeds weight, the
opposing forces of lift and weight are no longer equal. The aircraft is
no longer in equilibrium and a change in flight performance will occur.
In this case, when lift exceeds weight, the aircraft will accelerate vertically.

If
we can put some numbers to formulas for a couple of specific examples,
without getting lost in the mathematics, it makes it very easy to see
the relationship between aircraft weight and performance. Let’s
take a look at the stall and at rate of climb. First, the stall.

The
formula for lift, which we all remember from ground school, is: Lift =
CLS(r/2)V2. The formula tells us that lift is equal to one-half the product
of four factors:

·
The Angle of Attack. Increasing the angle of attack increases the amount
of lift and reaches its maximum value at the Critical Angle of Attack.
Increasing the angle of attack beyond the critical angle of attack results
in a significant reduction of lift: a stall. The point at which the stall
is reached depends on the shape of the wing profile. This is expressed
in the formula for lift by the Coefficient of Lift (CL); the critical
angle of attack, the angle at which maximum lift is produced, is represented
as CLmax.
· The Square of the Airspeed (V2). Increasing airspeed results
in a significant increase in lift. We can see from the formula that lift
increases with the Square of the Velocity. If we double the airspeed,
we increase lift four fold.
· Air Density (r). Density decreases with altitude and increased
temperature. Lower density results in less lift.
· Wing Surface (S). Larger wing surfaces produce more lift.

For
our purposes, we’ll say that CL, S and r remain constant. Once our
aircraft is in flight at a given altitude we can make the assumption that
the surface area of our wings, baring some tragic occurrence, and the
air density will remain constant. Since we are speaking of the stall,
which occurs at a fixed angle of attack, we can consider CL as a constant
using the value for CLmax.

To
simplify our lives as we look at the issue of weight, we can assign the
product of the factors for CL, S and r in the formula for lift a constant
value, let’s say “K”. So we can look at our formula,
in its simplified form, as Lift = KV2: lift is equal to K times the square
of the velocity.

Let’s
use a typical training aircraft which most of us have flown at one point
or another for numbers: the C-172. According to the POH for the 1976 M
model, the stall speed, depending on the position of the centre of gravity,
is approximately 50 KCAS at gross weight, 2300 lbs. This gives us some
numbers to work with.

Reminding
ourselves that in un-accelerated flight lift is equal to weight, we can
say that weight is also equal to our constant “K” times the
square of the velocity (W = KV2).

If
we plug in our numbers and solve for K, we can apply that number using
weights other than full gross. V = 50 KCAS (from the POH); W = 2300 lbs.
Using the formula we see that 2300 = K x 2500 or we could express this
as K = 2300/2500. Solving for K we find, in this case, K = 0.92.

Let’s
see what happens to the stall speed when we reduce the weight to, say,
1800 lbs., a reduction of 500 lbs., 22% of our gross weight. Now, V2 =1800/0.92.
In this case we find our 1g stall speed, at 1800 lbs., would be 44.2 KCAS,
a 12% reduction in the stall speed.

A
rule of thumb suggested by William Kershner (1) for finding the effects
of weight change on airspeed is to, “…reduce the airspeed
by one-half of the percentage of the Weight reduction”. In this
case that would give us a “rule of thumb” stall speed of approximately
44.5 KCAS. It isn’t quite as precise, perhaps, but it certainly
is in the ballpark.

I
don’t know about your eyes, but I would certainly have a difficult
time finding the difference on the airspeed indicator between 44.2 and
44.5.

Rate
of climb is another performance factor dependent on the flying weight
of the aircraft. Rate of climb is a function of two factors: excess thrust
horsepower and weight. It is generally expressed by the formula: Rate
of Climb is equal to Excess Thrust Horse Power times 33,000 divided by
Weight (R/C=ETHP x 33,000/W) (2).

33,000
(550 x 60) is simply the conversion of horsepower, which is normally expressed
in foot-pounds per second, into foot-pounds per minute (3). We normally
measure rate of climb in terms of feet per minute. It reduces confusion
to keep our units consistent. I don’t know about you, but I certainly
have a sufficiency of confusion in my life, already.

Going
back to our C-172 POH, we find, under standard conditions at gross weight,
Cessna tells us we can expect a rate of climb of 645’/min at sea
level. Plugging this information into our formula for Rate of Climb we
find that the aircraft produces approximately 45 Excess Thrust Horse Power
(645 @ 45 x 33,000/2300) under these conditions.

If
we reduce our weight to 1800 lbs. again and run the formula, assuming
the same excess thrust horse power—this is simplifying just a bit,
but it demonstrates the point—we find that the Rate of Climb has
increased to 825’/minute, a 128% increase (R/C = 45 x 33,000/1800).

The
teacher in me wants to say here, “So, what can we learn from this?”
On a practical, day to day level: increase weight, increase stall speed;
decrease weight, increase rate of climb, and visa versa. If we need to
get more specific, we can always do the math.

We’ve
all been tempted at one time or another to have a go at a short runway
possibly with an obstacle at the end when loaded just a little on the
heavy side. What a perfect moment to remember: the numbers don’t
lie.

All
considered it’s a healthy concept to keep in mind: the flying weight
of your aircraft directly affects its performance. Each time. Every time.
No exceptions.